Your search keyword '"Stillman, Mike"' showing total 8 results

1. Quadratic Gorenstein Rings and the Koszul Property II.

Author

Mastroeni, Matthew, Schenck, Hal, and Stillman, Mike

Subjects

GORENSTEIN rings, QUADRATIC forms

Abstract

Conca–Rossi–Valla [ 6 ] ask if every quadratic Gorenstein ring |$R$| of regularity three is Koszul. In [ 15 ], we use idealization to answer their question, proving that in nine or more variables there exist quadratic Gorenstein rings of regularity three, which are not Koszul. In this paper, we study the analog of the Conca–Rossi–Valla question when the regularity of |$R$| is four or more. Let |$R$| be a quadratic Gorenstein ring having |${\operatorname {codim}} \ R = c$| and |${\operatorname {reg}} \ R = r \ge 4$|⁠. We prove that if |$c = r+1$| then |$R$| is always Koszul, and for every |$c \geq r+2$|⁠ , we construct quadratic Gorenstein rings that are not Koszul, answering questions of Matsuda [ 16 ] and Migliore–Nagel [ 19 ]. [ABSTRACT FROM AUTHOR]

Published

2023

2. Superpotentials from singular divisors.

Author

Gendler, Naomi, Kim, Manki, McAllister, Liam, Moritz, Jakob, and Stillman, Mike

Abstract

We study Euclidean D3-branes wrapping divisors D in Calabi-Yau orientifold compactifications of type IIB string theory. Witten’s counting of fermion zero modes in terms of the cohomology of the structure sheaf O D applies when D is smooth, but we argue that effective divisors of Calabi-Yau threefolds typically have singularities along rational curves. We generalize the counting of fermion zero modes to such singular divisors, in terms of the cohomology of the structure sheaf O D ¯ of the normalization D ¯ of D. We establish this by detailing compactifications in which the singularities can be unwound by passing through flop transitions, giving a physical incarnation of the normalization process. Analytically continuing the superpotential through the flops, we find that singular divisors whose normalizations are rigid can contribute to the superpotential: specifically, h + • O D ¯ = 1 0 0 and h − • O D ¯ = 0 0 0 give a sufficient condition for a contribution. The examples that we present feature infinitely many isomorphic geometric phases, with corresponding infinite-order monodromy groups Γ. We use the action of Γ on effective divisors to determine the exact effective cones, which have infinitely many generators. The resulting nonperturbative superpotentials are Jacobi theta functions, whose modular symmetries suggest the existence of strong-weak coupling dualities involving inversion of divisor volumes. [ABSTRACT FROM AUTHOR]

Published

2022

3. Quadratic Gorenstein rings and the Koszul property I.

Author

Mastroeni, Matthew, Schenck, Hal, and Stillman, Mike

Subjects

GORENSTEIN rings, COHEN-Macaulay rings, KOSZUL algebras, ALGEBRA, MATHEMATICS

Abstract

Let R be a standard graded Gorenstein algebra over a field presented by quadrics. In [Compositio Math. 129 (2001), no. 1, 95-121], Conca-Rossi-Valla show that such a ring is Koszul if reg R ≤ 2 or if reg R = 3 and c = codim R ≤ 4, and they ask whether this is true for reg R = 3 in general. We determine sufficient conditions on a non-Koszul quadratic Cohen-Macaulay ring R that guarantee the Nagata idealization ~ R = R × ωR(−a−1) is a non-Koszul quadratic Gorenstein ring. We prove there exist rings of regularity 3 satisfying our conditions for all c ≥ 9; this yields a negative answer to the question from the above-mentioned paper. [ABSTRACT FROM AUTHOR]

Published

2021

4. The Kreuzer-Skarke axiverse.

Author

Demirtas, Mehmet, Long, Cody, McAllister, Liam, and Stillman, Mike

Subjects

TOPOLOGICAL property, HYPERSURFACES, INSTANTONS, AXIONS, POLYTOPES

Abstract

We study the topological properties of Calabi-Yau threefold hypersurfaces at large h1,1. We obtain two million threefolds X by triangulating polytopes from the Kreuzer-Skarke list, including all polytopes with 240 ≤ h1,1 ≤ 491. We show that the Kähler cone of X is very narrow at large h1,1, and as a consequence, control of the α′ expansion in string compactifications on X is correlated with the presence of ultralight axions. If every effective curve has volume ≥ 1 in string units, then the typical volumes of irreducible effective curves and divisors, and of X itself, scale as (h1,1)p, with 3 ≲ p ≲ 7 depending on the type of cycle in question. Instantons from branes wrapping these cycles are thus highly suppressed. [ABSTRACT FROM AUTHOR]

Published

2020

5. Minimal surfaces and weak gravity.

Author

Demirtas, Mehmet, Long, Cody, McAllister, Liam, and Stillman, Mike

Abstract

We show that the Weak Gravity Conjecture (WGC) implies a nontrivial upper bound on the volumes of the minimal-volume cycles in certain homology classes that admit no calibrated representatives. In compactification of type IIB string theory on an orientifold X of a Calabi-Yau threefold, we consider a homology class [Σ] ∈ H4(X, ℝ) represented by a union Σ∪ of holomorphic and antiholomorphic cycles. The instanton form of the WGC applied to the axion charge [Σ] implies an upper bound on the action of a non-BPS Euclidean D3-brane wrapping the minimal-volume representative Σmin of [Σ]. We give an explicit example of an orientifold X of a hypersurface in a toric variety, and a hyperplane H ⊂ H4(X, ℝ), such that for any [Σ] ∈ H that satisfies the WGC, the minimal volume obeys Vol (Σmin) ≪ Vol(Σ∪): the holomorphic and antiholomorphic components recombine to form a much smaller cycle. In particular, the sub-Lattice WGC applied to X implies large recombination, no matter how sparse the sublattice. Non-BPS instantons wrapping Σmin are then more important than would be predicted from a study of BPS instantons wrapping the separate components of Σ∪. Our analysis hinges on a novel computation of effective divisors in X that are not inherited from effective divisors of the toric variety. [ABSTRACT FROM AUTHOR]

Published

2020

6. HIGH RANK LINEAR SYZYGIES ON LOW RANK QUADRICS.

Author

Schenck, Hal and Stillman, Mike

Subjects

QUADRICS, MATHEMATICAL decomposition, SYZYGIES (Mathematics), MATHEMATICAL category theory, KOSZUL algebras

Abstract

We study the linear syzygies of a homogeneous ideal I § S = Symk (V ), focussing on the k graded betti numbers bi,i+1 = dimk Tori(S/I,k)i+1. 0 For a variety X and divisor D with V = H (D), what conditions on D ensure that bi,i+1 ∈ 0? Eisenbud has shown that a decomposition D ~ A+B such that A and B have at least two sections gives rise to determinantal equations (and corresponding syzygies) in IX; and conjectured that if I2 is generated by quadrics of rank ≤ 4, then the last nonvanishing bi,i+1 is a consequence of such equations. We describe obstructions to this conjecture and prove a variant. The obstructions arise from toric specializations of the Rees algebra of Koszul cycles, and we give an explicit construction of toric varieties with minimal linear syzygies of arbitrarily high rank. This gives one answer to a question posed by Eisenbud and Koh. [ABSTRACT FROM AUTHOR]

Published

2012

7. The Spirit and the Dust.

Author

Stillman, Mike

Subjects

DEATH, INTERNAL medicine, PHYSICIANS

Abstract

A personal narrative is presented which explores the author's experience of seeing many patients died from different causes as a physician in internal medicine from September 1999 to July 2013.

Published

2014

8. A foundation of failure.

Author

Stillman, Mike

Subjects

MEDICAL practice, PROFESSIONALISM, ATTITUDES toward work, FEAR of failure, MEDICAL errors, GENERAL practitioners, MEDICAL students, CLINICAL competence, PHILOSOPHY of medicine

Abstract

The article focuses on the definition of professionalism. It discusses the scope and understanding of medical students on professionalism and how these understanding contributes their future practice. Views were presented on how professionalism plays a role in the struggle to prevent medical challenges like fear of failure and errors among physicians.

Published

2009